The p-Laplace equation in domains with multiple crack section via pencil operators

Abstract

The p-Laplace equation · (| u|n u)=0 n>0, in a bounded domain ⊂ 2, with inhomogeneous Dirichlet conditions on the smooth boundary is considered. In addition, there is a finite collection of curves = 1...m ⊂ , \on which we assume homogeneous Dirichlet boundary conditions u=0, modeling a multiple crack formation, focusing at the origin 0 ∈ . This makes the above quasilinear elliptic problem overdetermined. Possible types of the behaviour of solution u(x,y) at the tip 0 of such admissible multiple cracks, being a "singularity" point, are described, on the basis of blow-up scaling techniques and a "nonlinear eigenvalue problem". Typical types of admissible cracks are shown to be governed by nodal sets of a countable family of nonlinear eigenfunctions, which are obtained via branching from harmonic polynomials that occur for n=0. Using a combination of analytic and numerical methods, saddle-node bifurcations in n are shown to occur for those nonlinear eigenvalues/eigenfunctions.